Asymptotics for optimal controls for horizontal mean curvature flow
Federica Dragoni (Cardiff University)
Abstract: The solutions to surface evolution problems like mean curvature flow can be expressed as value functions of suitable stochastic control problems, obtained as limit of a family of regularised control problems. The control-theoretical approach is particularly suited for such problems for degenerate geometries like the Heisenberg group. In this situation a new type of singularities absent for the Euclidean mean curvature flow occurs, the so-called characteristic points. In this talk I will investigate the asymptotic behaviour of the regularised optimal controls in the vicinity of such characteristic points.
Join work with Nicolas Dirr and Raffaele Grande.
analysis of PDEsdifferential geometrymetric geometryoptimization and controlspectral theory
Audience: researchers in the topic
Series comments: The "Sub-Riemannian seminars" are the union of the "Séminaire de géométrie et analyse sous-riemannienne" (held in Paris since 2011) and the "International Sub-Riemannian Seminars", which were born in spring 2020 as a reaction to the COVID-19 pandemic.
The new format will gather every 3 weeks on average, alternating between these types of sessions:
- physical session in Paris (Laboratoire Jacques-Louis Lions), also transmitted online on Zoom.
- fully online session on Zoom.
- special session hosted physically somewhere else, and transmitted online.
| Organizers: | Ugo Boscain, Enrico Le Donne, Luca Rizzi*, Mario Sigalotti, Emmanuel Trelat |
| *contact for this listing |